sive 



C") 



532 Petri Caixegari 



(X — •/ OT-+-1 ) . . . (x-—r) (X — TO-+-1 ) . .. X 



1.2.3...W ~ ' 1.2.3.../» 



(x—m^1)...(x—1) J (jc— ??H-1)...(.r— 2) 7(r— t) 

 1.2.3...(Hi— 1) 'T"* 1.2.3...(w— 2) ■ r.2~ 



^ J(7— '')--07— »^-f -1) 

 "~ 1.2.3...;» 



3. Ta aequalitate (2), ubi p est quantitas qiialiscumque, si 

 poaatur r=.in, haec series habebitur inverse ordiue 



1.2.3.../« 



1 .2.3 ...(/ra — 1) 



1.2.3...(?»— 2) ■- -^ ^ 



_^[l(i)_f_...H-1("+/'-^l)], 



in qua uegativi sunt termini, quorum coefficientes ex numero 

 impari factorum resultant. Cum p sit elementum omnino ex- 

 traneum, ita ejusdem potentlae Inter se destrui debent, ideoque 

 scribi poterit — p loco ;;. Praeterea notum est expressionem 



[1(^)_^-...^_1('.+;'+1)] in banc [l(i)-f- .".T-f-KA+i)] 

 transformari posse, ex quo eruetur 



